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DISK ALGEBRA

Disk algebra

Set of holomorphic functions

specifically in functional and complex analysis, the disk algebra A(D) (also spelled disc algebra) is the set of holomorphic functions ƒ : D → C {\displaystyle

Disk algebra

Disk_algebra

Disk (mathematics)

Plane figure, bounded by circle

For instance, every closed disk is compact whereas every open disk is not compact. However from the viewpoint of algebraic topology they share many properties:

Disk (mathematics)

Disk_(mathematics)

Haar wavelet

First known wavelet basis

Schauder basis in the disk algebra A(D). This was proved in 1974 by Bočkarev, after the existence of a basis for the disk algebra had remained open for

Haar wavelet

Haar_wavelet

Banach space

Normed vector space that is complete

is a Banach algebra. The disk algebra A ( D ) {\displaystyle A(\mathbf {D} )} consists of functions holomorphic in the open unit disk D ⊆ C {\displaystyle

Banach space

Banach_space

H-infinity methods in control theory

extend continuously to the boundary and are continuous at infinity is the disk algebra. For a matrix-valued function, the norm can be interpreted as a maximum

H-infinity methods in control theory

H-infinity_methods_in_control_theory

Fundamental theorem of algebra

Every polynomial has a real or complex root

of algebra using De Moivre's formula and extreme value theorem on a compact set in a textbook called Linear Algebra Done Right. Find a closed disk D of

Fundamental theorem of algebra

Fundamental_theorem_of_algebra

List of functional analysis topics

algebra Abelian von Neumann algebra von Neumann double commutant theorem Commutant, bicommutant Topological ring Noncommutative geometry Disk algebra

List of functional analysis topics

List_of_functional_analysis_topics

Algebraic geometry

Branch of mathematics

Algebraic geometry is a branch of mathematics which uses abstract algebraic techniques, mainly from commutative algebra, to solve geometrical problems

Algebraic geometry

Algebraic_geometry

List of complex analysis topics

Holomorphic functions are analytic Schwarzian derivative Analytic capacity Disk algebra Univalent function Ahlfors theory Bieberbach conjecture Borel–Carathéodory

List of complex analysis topics

List_of_complex_analysis_topics

Algebraic topology

Branch of mathematics

Algebraic topology is a branch of mathematics that uses tools from abstract algebra to study topological spaces. The basic goal is to find algebraic invariants

Algebraic topology

Algebraic_topology

Planar algebra

output disk and a white (or black) ⋆ {\displaystyle \star } -marked interval, admits a planar algebra structure. The Temperley-Lieb planar algebra T L (

Planar algebra

Planar_algebra

Black hole

Compact astronomical body

gas in the outer disk, transferring angular momentum to the outer disk. The loss of angular momentum forces the gas in the inner disk to orbit closer to

Black hole

Black_hole

Schauder basis

Computational tool

remained open for a long time. For example, the question of whether the disk algebra A(D) has a Schauder basis remained open for more than forty years, until

Schauder basis

Schauder_basis

Special unitary group

Group of unitary complex matrices with determinant of 1

structure of this Lie algebra can be found below in § Lie algebra structure. In the physics literature, it is common to identify the Lie algebra with the space

Special unitary group

Special_unitary_group

Noncommutative algebraic geometry

Branch of mathematics

Noncommutative algebraic geometry is a branch of mathematics, and more specifically a direction in noncommutative geometry, that studies the geometric

Noncommutative algebraic geometry

Noncommutative_algebraic_geometry

Operad

Generalization of associativity properties

these operations. Given an operad O {\displaystyle O} , one defines an algebra over O {\displaystyle O} to be a set together with concrete operations

Operad

En-ring

Symmetric monoidal infinity category

definition is that A is an algebra in C over the little n-disks operad. An E n {\displaystyle {\mathcal {E}}_{n}} -algebra in vector spaces over a field

En-ring

Peter G. Casazza

American mathematician

Peter G. (November 1992). "The Norms of Projections Onto Ideals in the Disk Algebra". Bulletin of the London Mathematical Society. 24 (6): 552–558. doi:10

Peter G. Casazza

Peter_G._Casazza

Differential geometry

Branch of mathematics

manifolds. It uses the techniques of vector calculus, linear algebra and multilinear algebra. The field has its origins in the study of spherical geometry

Differential geometry

Differential_geometry

Orbifold

Generalized manifold

refers to the theory attached to the fixed point subalgebra of a vertex algebra under the action of a finite group of automorphisms. The main example of

Orbifold

Plane-based geometric algebra

Application of Clifford algebra

Plane-based geometric algebra is an application of Clifford algebra to modelling planes, lines, points, and rigid transformations. Generally this is with

Plane-based geometric algebra

Plane-based_geometric_algebra

Geometry

Branch of mathematics

of mathematics that are apparently unrelated. For example, methods of algebraic geometry are fundamental in Wiles's proof of Fermat's Last Theorem, a

Geometry

Frobenius algebra

Algebraic structure with "nice" duality properties

theory, a Frobenius algebra is a finite-dimensional unital associative algebra with a special kind of bilinear form which gives the algebras particularly nice

Frobenius algebra

Frobenius_algebra

Gershgorin circle theorem

Bound on eigenvalues

continuity is used in a proof of the Gerschgorin disk theorem, it should be justified that the sum of algebraic multiplicities of eigenvalues remains unchanged

Gershgorin circle theorem

Gershgorin_circle_theorem

Arithmetic geometry

Branch of algebraic geometry

mathematics, arithmetic geometry is roughly the application of techniques from algebraic geometry to problems in number theory. Arithmetic geometry is centered

Arithmetic geometry

Arithmetic_geometry

Pizza theorem

Equality of areas of a sliced disk

theorem states the equality of two areas that arise when one partitions a disk in a certain way. The theorem is so called because it mimics a traditional

Pizza theorem

Pizza_theorem

Area of a circle

Concept in geometry

as the area of a circle in informal contexts, strictly speaking, the term disk refers to the interior region of the circle, while circle is reserved for

Area of a circle

Area_of_a_circle

Topics referred to by the same term

conventions Head and Disk Assembly of a Winchester disk Helicase-dependent amplification High density amorphous ice Higher-dimensional algebra Dragonair Ein

HDA

Circle packing in a circle

Two-dimensional packing problem

of 12 Congruent Circles in a Circle, Beiträge zur Algebra und Geometrie, Contributions to Algebra and Geometry 41 (2000) ?, 401–409. F. Fodor, The Densest

Circle packing in a circle

Circle_packing_in_a_circle

Dimension

Property of a mathematical space

cardinality of a basis) is often referred to as the Hamel dimension or algebraic dimension to distinguish it from other notions of dimension. For the non-free

Dimension

Clustered file system

Type of decentralized filesystem

2019. Mokadem, Riad; Litwin, Witold; Schwarz, Thomas (2006). "Disk Backup Through Algebraic Signatures in Scalable Distributed Data Structures" (PDF). DEXA

Clustered file system

Clustered_file_system

Grothendieck's Galois theory

Abstract approach to algebraic geometry

to provide a way to study the fundamental group of algebraic topology in the setting of algebraic geometry. It provides, in the classical setting of field

Grothendieck's Galois theory

Grothendieck's_Galois_theory

Hyperbolic geometry

Type of non-Euclidean geometry

{\displaystyle 2\pi R\sinh {\frac {r}{R}}\,.} And the area of the enclosed disk is: 4 π R 2 sinh 2 ⁡ r 2 R = 2 π R 2 ( cosh ⁡ r R − 1 ) . {\displaystyle

Hyperbolic geometry

Hyperbolic_geometry

Computational geometry

Branch of computer science

Hyperbolic Non-Archimedean geometry Projective Affine Synthetic Analytic Algebraic Arithmetic Diophantine Differential Riemannian Symplectic Discrete differential

Computational geometry

Computational_geometry

List of Lie groups topics

enveloping algebra Baker–Campbell–Hausdorff formula Casimir invariant Killing form Kac–Moody algebra Affine Lie algebra Loop algebra Graded Lie algebra One-parameter

List of Lie groups topics

List_of_Lie_groups_topics

Hermitian symmetric space

Manifold with inversion symmetry

complexification SL(2,C). In this case the non-compact space is the unit disk, a homogeneous space for SU(1,1). It is a bounded domain in the complex plane

Hermitian symmetric space

Hermitian_symmetric_space

Noncommutative geometry

Branch of mathematics

operator-algebraic methods based on C*-algebras, von Neumann algebras, and spectral triples; algebraic approaches to noncommutative rings and graded algebras;

Noncommutative geometry

Noncommutative_geometry

Idempotence

Property of operations

application. The concept of idempotence arises in a number of places in abstract algebra (in particular, in the theory of projectors and closure operators) and

Idempotence

Symmetric cone

Open convex self-dual cones

from the case of the unit disk, the upper halfplane and Riemann sphere. All these symmetries extend to the larger Jordan algebra and its compactification

Symmetric cone

Symmetric_cone

Blackboard bold

Typeface style used in mathematics

in Unicode or amsmath LaTeX) is sometimes used by number theorists and algebraic geometers to designate the group scheme of n-th roots of unity. Latin

Blackboard bold

Blackboard_bold

FORM (symbolic manipulation system)

Mathematical software

myexpr = 8*x^3; FORM was started in 1984 as a successor to Schoonschip, an algebra engine developed by M. Veltman. It was initially coded in FORTRAN 77, but

FORM (symbolic manipulation system)

FORM_(symbolic_manipulation_system)

One-dimensional space

Space with one dimension

In case the ring is an algebra over a field, these spaces are one-dimensional with respect to the algebra, even if the algebra is of higher dimensionality

One-dimensional space

One-dimensional_space

Operator theory

Mathematical study of linear operators

collection of operators forms an algebra over a field, then it is an operator algebra. The description of operator algebras is part of operator theory. Single

Operator theory

Operator_theory

Beltrami–Klein model

Model of hyperbolic geometry

geometry, the Beltrami–Klein model, also called the projective model, Klein disk model, and the Cayley–Klein model, is a model of hyperbolic geometry in which

Beltrami–Klein model

Beltrami–Klein_model

Straightedge and compass construction

Method of drawing geometric objects

construction can be used to solve the former two problems. In terms of algebra, a length is constructible if and only if it represents a constructible

Straightedge and compass construction

Straightedge_and_compass_construction

Three-dimensional space

Geometric model of the physical space

useful for certain geometries. The 18th century, Alexis Clairaut studied algebraic curves in space, the concept of tangent space and curvature, and the use

Three-dimensional space

Three-dimensional_space

Grothendieck–Teichmüller group

Mathematical group

quasitriangular quasi-Hopf algebras and on a group that is closely connected with Gal(Q/Q)", Rossiĭskaya Akademiya Nauk. Algebra i Analiz (in Russian), 2

Grothendieck–Teichmüller group

Grothendieck–Teichmüller_group

Two-dimensional space

Mathematical space with two coordinates

stretched, twisted, or bent without changing its essential properties. An algebraic surface is a two-dimensional set of solutions of a system of polynomial

Two-dimensional space

Two-dimensional_space

Finite geometry

Geometric system with a finite number of points

inversive geometries. Finite geometries may be constructed via linear algebra, starting from vector spaces over a finite field; the affine and projective

Finite geometry

Finite_geometry

Diophantine geometry

Mathematics of varieties with integer coordinates

polynomial equations) by means of powerful methods in algebraic geometry. The extensive development of algebraic geometry in the 20th century produced powerful

Diophantine geometry

Diophantine_geometry

Harmonic polynomial

Polynomial whose Laplacian is zero

Real harmonic polynomials in two variables up to degree 6, graphed over the unit disk.

Harmonic polynomial

Harmonic_polynomial

Topology

Branch of mathematics

proofs. Algebraic topology is a branch of mathematics that uses tools from algebra to study topological spaces. The basic goal is to find algebraic invariants

Topology

Wold's decomposition

function in C(T). The algebra C*(S) is called the Toeplitz algebra. Theorem (Coburn) C*(V) is isomorphic to the Toeplitz algebra and V is the isomorphic

Wold's decomposition

Wold's_decomposition

Rouché's theorem

Theorem about zeros of holomorphic functions

5 + 3 z 3 + 7 {\displaystyle z^{5}+3z^{3}+7} has exactly 5 zeros in the disk | z | < 2 {\displaystyle |z|<2} since | 3 z 3 + 7 | ≤ 31 < 32 = | z 5 | {\displaystyle

Rouché's theorem

Rouché's_theorem

Homotopy

Continuous deformation between two continuous functions

important invariants in algebraic topology. In practice, there are technical difficulties in using homotopies with certain spaces. Algebraic topologists work

Homotopy

Brouwer fixed-point theorem

Theorem in topology

Borsuk-Ulam theorem require tools from algebraic topology. The proof uses the observation that the boundary of the n-disk Dn is Sn−1, the (n − 1)-sphere. Suppose

Brouwer fixed-point theorem

Brouwer_fixed-point_theorem

Cylinder (disambiguation)

Topics referred to by the same term

refer to: Cylinder (algebra), the Cartesian product of a set with its superset Cylinder (disk drive), a division of data in a disk drive Cylinder (engine)

Cylinder (disambiguation)

Cylinder_(disambiguation)

List of unsolved problems in mathematics

mathematics, such as theoretical physics, computer science, algebra, analysis, combinatorics, algebraic, differential, discrete and Euclidean geometries, graph

List of unsolved problems in mathematics

List_of_unsolved_problems_in_mathematics

Liouville's theorem (complex analysis)

Theorem in complex analysis

short proof of the fundamental theorem of algebra using Liouville's theorem. Proof (Fundamental theorem of algebra) Suppose for the sake of contradiction

Liouville's theorem (complex analysis)

Liouville's_theorem_(complex_analysis)

Absolutely convex set

Convex and balanced set

or disked if it is convex and balanced (some people use the term "circled" instead of "balanced"), in which case it is called a disk. The disked hull

Absolutely convex set

Absolutely_convex_set

Riemann surface

One-dimensional complex manifold

real projective plane do not. Every compact Riemann surface is a complex algebraic curve by Chow's theorem and the Riemann–Roch theorem. There are several

Riemann surface

Riemann_surface

Auxiliary normed space

from disks were systematically employed by Alexander Grothendieck to define nuclear operators and nuclear spaces. One method is used if the disk D {\displaystyle

Auxiliary normed space

Auxiliary_normed_space

Commutative ring

Algebraic structure

The study of commutative rings is called commutative algebra. Complementarily, noncommutative algebra is the study of ring properties that are not specific

Commutative ring

Commutative_ring

Pythagorean theorem

Relation between sides of a right triangle

theorem. The proofs are diverse, including both geometric proofs and algebraic proofs, with some dating back thousands of years. When Euclidean space

Pythagorean theorem

Pythagorean_theorem

Cauchy's integral formula

Provides integral formulas for all derivatives of a holomorphic function

that a holomorphic function defined on a disk is completely determined by its values on the boundary of the disk, and it provides integral formulas for

Cauchy's integral formula

Cauchy's_integral_formula

Incompressible surface

surface other than a sphere is incompressible if any disk with its boundary on the surface spans a disk in the surface. Incompressible surfaces are used for

Incompressible surface

Incompressible_surface

Complex geometry

Study of complex manifolds and several complex variables

concerned with the study of spaces such as complex manifolds and complex algebraic varieties, functions of several complex variables, and holomorphic constructions

Complex geometry

Complex_geometry

Projective geometry

Type of geometry

abstract mathematics (including invariant theory, the Italian school of algebraic geometry, and Felix Klein's Erlangen programme resulting in the study

Projective geometry

Projective_geometry

Inner space

Topics referred to by the same term

InnerSpace, a hard disk drive series by Priam Corporation in the 1980s Inner product space, a kind of vector space in linear algebra Lumen (anatomy), an

Inner space

Inner_space

Benchmark (computing)

Standardized performance evaluation

disk benchmarking software may be able to optionally start measuring the disk speed within a specified range of the disk rather than the full disk, measure

Benchmark (computing)

Benchmark_(computing)

Coding theory

Study of the properties of codes and their fitness

needed] The term algebraic coding theory denotes the sub-field of coding theory where the properties of codes are expressed in algebraic terms and then

Coding theory

Coding_theory

Euler characteristic

Topological invariant in mathematics

In mathematics, and more specifically in algebraic topology and polyhedral combinatorics, the Euler characteristic (or Euler number, or Euler–Poincaré

Euler characteristic

Euler_characteristic

NP-intermediate

Complexity class of problems

that time, including finding a large disjoint set of unit disks from a given set of disks in the hyperbolic plane, and finding a graph with few vertices

NP-intermediate

String theory

Theory of subatomic structure

called algebraic varieties which are defined by the vanishing of polynomials. For example, the Clebsch cubic illustrated on the right is an algebraic variety

String theory

String_theory

IBM PC DOS

Computer operating system

acronym for IBM Personal Computer Disk Operating System), also known as IBM DOS or PC DOS, is a discontinued disk operating system for the IBM Personal

IBM PC DOS

IBM_PC_DOS

Computer hardware

Physical components of a computer

George Boole invented Boolean algebra—a system of logic where each proposition is either true or false. Boolean algebra is now the basis of the circuits

Computer hardware

Computer_hardware

Victor J. Katz

American mathematician and historian (1942–present)

as professor emeritus in 2005. As a mathematician Katz specializes in algebra, but he is mainly known for his work on the history of mathematics and

Victor J. Katz

Victor_J._Katz

Split-quaternion

Four-dimensional associative algebra over the reals

In abstract algebra, the split-quaternions or coquaternions form an algebraic structure introduced by James Cockle in 1849 under the latter name. They

Split-quaternion

Fractal

Infinitely detailed mathematical structure

Hyperbolic Non-Archimedean geometry Projective Affine Synthetic Analytic Algebraic Arithmetic Diophantine Differential Riemannian Symplectic Discrete differential

Fractal

Perpendicular

Relationship between two lines that meet at a right angle

between more abstract non-geometric orthogonal objects, as in linear algebra (e.g., principal components analysis); normal distance, involving a surface

Perpendicular

Real projective plane

Compact non-orientable two-dimensional manifold

cross-capped disk is homeomorphic to a self-intersecting disk, as shown in Figure 3. The self-intersecting disk is homeomorphic to an ordinary disk. The parametric

Real projective plane

Real_projective_plane

Manifold

Topological space that locally resembles Euclidean space

Euclidean space, an algebraic variety is glued together from affine algebraic varieties, which are zero sets of polynomials over algebraically closed fields

Manifold

Graph theory

Area of discrete mathematics

where he drew an analogy between "quantic invariants" and "co-variants" of algebra and molecular diagrams. The definition of a graph can vary, but one can

Graph theory

Graph_theory

Bernhard Riemann

German mathematician (1826–1866)

subsequently become major parts of the theories of Riemannian geometry, algebraic geometry, and complex manifold theory. The theory of Riemann surfaces

Bernhard Riemann

Bernhard_Riemann

Homology (mathematics)

Algebraic structure associated with a topological space

In mathematics, the term homology, originally introduced in algebraic topology, has three primary, closely related usages. First, there is the homology

Homology (mathematics)

Homology_(mathematics)

Singularity (mathematics)

Point where a mathematical object behaves irregularly

) {\displaystyle (0,0)} . For singularities in algebraic geometry, see singular point of an algebraic variety. For singularities in differential geometry

Singularity (mathematics)

Singularity_(mathematics)

Genus (mathematics)

Number of "holes" of a surface

projective algebraic scheme X {\displaystyle X} : the arithmetic genus and the geometric genus. When X {\displaystyle X} is an algebraic curve with field

Genus (mathematics)

Genus_(mathematics)

Discrete geometry

Branch of geometry that studies combinatorial properties and constructive methods

century this turned into the field of algebraic topology. In 1978, the situation was reversed – methods from algebraic topology were used to solve a problem

Discrete geometry

Discrete_geometry

Line (geometry)

Straight figure with zero width and depth

Introduction to MATHEMATICA: A Handbook for Precalculus, Calculus, and Linear Algebra, Cambridge University Press, p. 314, ISBN 9781139473736 Wylie Jr., C.R

Line (geometry)

Line_(geometry)

Synthetic geometry

Geometry without using coordinates

approaches are equivalent has been proved by Emil Artin in his book Geometric Algebra. Because of this equivalence, the distinction between synthetic and analytic

Synthetic geometry

Synthetic_geometry

Unilateral shift operator

Operator on a Hilbert space that shifts basis vectors

functions on the unit interval, but has a continuous spectrum (on the unit disk), when acting on the Hilbert space of square-integrable functions. When acting

Unilateral shift operator

Unilateral_shift_operator

Binomial theorem

Algebraic expansion of powers of a binomial

defined on an open disk of radius |x| centered at x. The generalized binomial theorem is valid also for elements x and y of a Banach algebra as long as xy

Binomial theorem

Binomial_theorem

Braid group

Group whose operation is a composition of braids

Yang–Baxter equation (see § Basic properties); and in monodromy invariants of algebraic geometry. In this introduction let n = 4; the generalization to other

Braid group

Braid_group

Topics referred to by the same term

measure of an object's luminosity. Dim or dimness may refer to: .dim, a disk image A keyword in most versions of the BASIC programming language 3,3'-Diindolylmethane

Dim

Mutation (Jordan algebra)

called a homotope, of a unital Jordan algebra is a new Jordan algebra defined by a given element of the Jordan algebra. The mutation has a unit if and only

Mutation (Jordan algebra)

Mutation_(Jordan_algebra)

Google Chrome

Web browser developed by Google

URLs that load application-specific pages instead of websites or files on disk. Chrome also has a built-in ability to enable experimental features. Originally

Google Chrome

Google_Chrome

Surface (topology)

Two-dimensional manifold

exact definition of a surface may depend on the context. Typically, in algebraic geometry, a surface may cross itself (and may have other singularities)

Surface (topology)

Surface_(topology)

History of geometry

Historical development of geometry

complexity, and have been subjected to the methods of calculus and abstract algebra, so that many modern branches of the field are barely recognizable as the

History of geometry

History_of_geometry

Generic point

Concept in algebraic geometry

In algebraic geometry, a generic point P of an algebraic variety X is a point in a general position, at which all generic properties are true, a generic

Generic point

Generic_point

Euclidean plane

Geometric model of the planar projection of the physical universe

Another mathematical way of viewing two-dimensional space is found in linear algebra, where the idea of independence is crucial. The plane has two dimensions

Euclidean plane

Euclidean_plane

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